ABCD is a parallelogram and the segment `bar(AD)` dividing it internally in the ratio `3:1` the line `bar(BP)` meet the diagonal AC in Q. Then the ratio `AQ:QC` is

ABCD is a parallelogram and the segment bar(AD) dividing it internally in the ratio 3:1 the line BP meet the diagonal AC in Q. Then the ratio AQ:QC is

ABCD is a parallelogram and P is a point on the segment overset(-)(AD) dividing it internally in the ratio 3:1. The line overset(-)(BP) meets the diagonal AC in Q. Then AQ: QC=

Divide a line segment of length 10cm internally in the ratio 3:2

Divide a line segment of length 8cm internally in the ratio 3:4 .

Divide a line segment of length 10 cm internally in the ratio 5:4.

Divide a line segment of length 8 cm internally in the ratio 4:2 .

ABCD is a parallelogram and P is the midpoint of the side AD. The line BP meets the diagonal AC in Q. Then, the ratio of AQ:QC is equal to

ABCD is a parallelogram and P is themid point of the side AD. The line BP meets the diagonal AC in Q. Then the ratio AQ : QC =